### Weighted composition operators from $F(p,q,s)$ spaces to ${H}_{\mu}^{\infty}$ spaces.

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Let H(B) denote the space of all holomorphic functions on the unit ball B of ℂⁿ. Let φ be a holomorphic self-map of B and g ∈ H(B) such that g(0) = 0. We study the integral-type operator ${C}_{\phi}^{g}f\left(z\right)={\int}_{0}^{1}\Re f\left(\phi \left(tz\right)\right)g\left(tz\right)dt/t$, f ∈ H(B). The boundedness and compactness of ${C}_{\phi}^{g}$ from Privalov spaces to Bloch-type spaces and little Bloch-type spaces are studied

Let φ and ψ be analytic self-maps of 𝔻. Using the pseudo-hyperbolic distance ρ(φ,ψ), we completely characterize the boundedness and compactness of the difference of generalized weighted composition operators between growth spaces.

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